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Question
find $\frac{ds}{dt}$. $s = t^{4}-3sec t + 5e^{t}$ $\frac{ds}{dt}=square$
Step1: Differentiate $t^4$
Using the power - rule $\frac{d}{dt}(t^n)=nt^{n - 1}$, for $n = 4$, we have $\frac{d}{dt}(t^4)=4t^{3}$.
Step2: Differentiate $-3\sec t$
The derivative of $\sec t$ is $\sec t\tan t$, so $\frac{d}{dt}(-3\sec t)=-3\sec t\tan t$.
Step3: Differentiate $5e^{t}$
The derivative of $e^{t}$ is $e^{t}$, so $\frac{d}{dt}(5e^{t}) = 5e^{t}$.
Step4: Combine the derivatives
By the sum - difference rule of differentiation $\frac{d}{dt}(u\pm v\pm w)=\frac{du}{dt}\pm\frac{dv}{dt}\pm\frac{dw}{dt}$, where $u = t^{4}$, $v = 3\sec t$, $w = 5e^{t}$. So $\frac{ds}{dt}=4t^{3}-3\sec t\tan t + 5e^{t}$.
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$4t^{3}-3\sec t\tan t + 5e^{t}$